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Structure of the GMAT exam
From http://richardbowles.tripod.com/gmat/summary.htm
The GMAT exam is actually two tests rolled into one.
The first part is the Analytical Writing Assessment (AWA). The score
that you get from this test is separate from the actual GMAT score
itself. Universities that specify a required GMAT score don't usually
specify an AWA requirement. You have to take the whole thing - you
can't just opt to take the GMAT part!
- The exam is entirely computer administrated. The
questions are all multiple choice except the essay questions where you
are required to type your essays into a box on the computer screen.
- You can take the exam as many times as you like, but the scores from all your attempts are recorded and passed on to any inquirer, so be sure you will get a good score before you consider sitting the exam.
- You have to answer all the multiple choice questions. You are not allowed skip any.
- Having moved on from a multiple choice question, you are not allowed to go back to it!
- The exam consists of the following parts in this order:
| Two essay questions (one Analysis of Issue, one Analysis of Argument) |
30 minutes per essay |
| An optional 5 minute break |
Please do take this. (You'll thank me!) |
| 41 Verbal reasoning questions (a mixture of critical reasoning, reading comprehension and sentence correction). |
75 minutes |
| An optional 5 minute break |
|
| 37 Mathematics questions (a mixture of problem solving and data sufficiency). |
75 minutes |
- There is a break of 5 minutes between each part of the
exam - but you can't opt to do the exam in parts (i.e. one part on one
day, another part on another day - no, no!)
- The essays come from two fixed topic lists, both published
in advance! If you work through all these essays, you can guarantee the
essays you see in the exam will be ones you have done before. However,
since there are well in excess of 200 essays on each list, you won't be
able to memorise perfect answers!
- The quantitative part of the exam (what ordinary people
call "mathematics") consists of two types of question: problem solving
(where you simply have to find the answer to a mathematical question)
and data sufficiency (where you have to work out whether two statements
provide enough information to answer a mathematical question).
- Unlike the other parts of the exam, the questions in the
maths section are chosen as you proceed depending on how well you have
done on the maths questions so far. The better you do on the maths
questions, the harder the questions that follow. The worse you do, the
easier the questions that follow.
An example of different sorts of question
Sentence correction: (which option should replace the underlined section to correct the sentence. Choose (A) if you think the original is correct).
An early example of 'rescue opera' was Gretry's Richard Coeur de Lion where King Richard is rescued by his minstrel, Blondel.
- where
- in which
- during which
- in whose
- in that
Critical reasoning: (testing your powers of logic and your ability to examine statements for hidden assumptions)
A desert-dweller showing an umbrella to his friend: "I bought it in Britain. When you want it to rain, you leave it at home!"
What logical flaw is the desert-dweller making?
- He hasn't provided a reason for his conclusion.
- He is making a justified assumption.
- He is muddling coincidence with cause and effect.
- He has based his conclusion on intuition not reason
- He assumes his friend hasn't yet seen an umbrella.
Problem solving: x lb of sugar costing m cents an ounce is mixed with y lb of sugar costing n cents an ounce. What is the cost per ounce of the mixture?
-
-
-
-
-
Data sufficiency: The average height of a class of boys is 1.45m. What is the average height of the tallest 10 children?
- There are 30 children in the class.
- The average height of the shortest 20 boys is 1.36m
- Statement (1) is sufficient on its own to answer
the question, but statement (2) isn't sufficient on its own to answer
the question.
- Statement (2) is sufficient on its own to answer the
question, but statement (1) isn't sufficient on its own to answer the
question.
- Both statements together are sufficient to answer the question, but neither one on its own is sufficient.
- Either statement on its own is sufficient to answer the question.
- Even put together, both statements aren't sufficient to answer the question.
An explanation of the example questions
Sentence correction:
In this case, part of the sentence is underlined. You
have to decide whether the words are grammatically correct and concise
as they stand, or whether the underlined section should be replaced by
one of the five options given. The first option, (A), is always
identical to the original wording, and you should choose it if you
think that the sentence is correct as it stands.
In this case, the word "where" is wrong, as it refers to physical places. The scene is in the opera, so the correct wording is "in which". Answer (B) is correct.
Critical reasoning:
There are a great many different types of critical
reasoning, dealt with at different points in this online tutorial, so I
shall just content myself with explaining this particular question.
The desert-dweller has found out that it often rains
when people leave their umbrellas at home, but he has not realised that
leaving the umbrella at home doesn't cause the rain. He assumes that
leaving the umbrella at home is the "magic spell" that makes the rain
happen. This is assuming cause and effect where there isn't any - the
correct answer is (C)
Problem solving:
The average cost per ounce of the mixture is found by
dividing the total cost of the mixture by the total number of ounces in
the mixture.
The cost of the first type of sugar must be 16xm as it costs m cents per ounce and there are 16x ounces altogether. The question tried to fool us by stating that there were x lb (pounds weight) of sugar. We have to multiply that by 16 to convert it to ounces.
Similarly, the cost of the second type of sugar is 16yn as there are y lb (= 16y ounces) at n cents an ounce. Therefore the total cost of the sugar is 16xm + 16yn = 16(xm + yn).
The total number of ounces in the mixture is 16x + 16y = 16(x + y). Doing the division makes the 16s cancel from the numerator and denominator, and gives (D) as the correct answer.
Two points to note here:
- Be familiar with Imperial measurements. GMAT is an
American exam, and the Americans prefer proper units of measurement
(feet, inches, gallons, pounds and ounces etc.), not that stupid
continental rubbish!
- Read the question with a hawk eye! They will try to catch you out on the tiniest details!
Data sufficiency:
In this case, you don't have to answer the question, merely to decide whether you have been given enough information to answer the question.
The question is followed by two statements, (1) and (2), and you have
to decide whether it can be solved using any combination of these. The
five options on the data sufficiency questions are always the same, so
learn the format of the answers by heart.
Could the answer be (A)?: Statement (1) tells us
that there are 30 children in the class. Note that the question stem
tells us that it is a "class of boys", so we needn't worry about
whether there are any girls or not - we can assume that "children" and
"boys" are synonymous here.
However, although that lets us work out the sum of all
the heights of all the children (from the average and the number of
children), it doesn't allow us to work out the average height of the
ten tallest boys. Statement (1) on its own is not enough to answer the
question, and the answer cannot be (A). Similarly, the answer cannot be
(D), as that says that either statement on its own is enough to answer
the question, and we know that isn't true of statement (1). In a data
sufficiency question, when you delete answer (A) as a possible answer,
then (D) always goes with it!
Could the answer be (B)?: Statement (2) allows
us to work out the sum of the heights of the shortest 20 boys in the
class. However, if we just take statement (2) on its own, then we can't
work out the average height of the ten tallest boys as we don't know
how many boys there are in the class. Remember, if the answer is to be
(B), then we have to pretend that we haven't seen statement (1)!
Statement (2) on its own is not enough to answer the question, and the
answer cannot be (B). We have already proved that the answer cannot be
(D), but the fact that it can't be (B) gives us added confirmation.
Could the answer be (C)?: Statement (1) lets us
work out the sum of the heights of all 30 boys in the class. Statement
(2) lets us work out the sum of the heights of the shortest 20 boys, so
the difference between these must be the sum of the heights of the
tallest 10 boys. Now that we know the sum of the heights of the ten
tallest boys, a quick division gives the average height of those boys.
Statements (1) and (2) are sufficient to answer the question when they are put together. The answer is (C).
The only answer that we never considered was (E). If we
had found that the correct answer hadn't been (C) (i.e. we still
couldn't answer the question with all the information that we had been
given), then we would have concluded that the answer was (E).
Distinguishing between a correct (C) answer and a correct (E) answer is
one of the hardest parts of data sufficiency questions.
One other thing to point out: We didn't actually work
out what the average height of the tallest ten boys was. That's not the
point! All we had to do was work out whether it was possible to do so.
What is the average height of the tallest 10 children? Who cares? The
fact is that we found we could do it, and that told us which option to
choose!
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POSTED BY PeterPhi AT 3/21/2008 7:49 AM
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